Advertisements
Advertisements
प्रश्न
Observe all the four triangles FAB, EAB, DAB and CAB as shown in the following figure.
- All triangles have the same base and the same altitude.
- All triangles are congruent.
- All triangles are equal in area.
- All triangles may not have the same perimeter.
Advertisements
उत्तर
1. True.
It is clear from the figure that all triangles have same base AB and all the vertices lie on the same line, so the distance between vertex and base of triangle (i.e. length of altitude) are equal.
2. False
It is clear from the figure that all triangles have only base line is equal and no such other lines are equal to each other.
3. True
Because the triangles on same base and between same parallel lines have equal in area.
4. True
It is clear from the figure that all triangles may not have the same perimeter.
APPEARS IN
संबंधित प्रश्न
Find the area of the triangle whose vertices are: (–5, –1), (3, –5), (5, 2)
The class X students of a secondary school in Krishinagar have been allotted a rectangular plot of land for their gardening activity. Saplings of Gulmohar are planted on the boundary at a distance of 1 m from each other. There is a triangular grassy lawn in the plot as shown in the following figure. The students are to sow seeds of flowering plants on the remaining area of the plot.
(i) Taking A as origin, find the coordinates of the vertices of the triangle.
(ii) What will be the coordinates of the vertices of Δ PQR if C is the origin?
Also calculate the areas of the triangles in these cases. What do you observe?
If area of triangle is 35 sq. units with vertices (2, −6), (5, 4) and (k, 4), then k is ______.
In a ΔABC, AB = 15 cm, BC = 13 cm and AC = 14 cm. Find the area of ΔABC and hence its altitude on AC ?
Show that the points (-3, -3),(3,3) and C (-3 `sqrt(3) , 3 sqrt(3))` are the vertices of an equilateral triangle.
Find the value of p for which the points (−5, 1), (1, p) and (4, −2) are collinear.
If the points A(1, 2), O(0, 0) and C(a, b) are collinear, then ______.
Area of triangle PQR is 100 cm2 (see figure). If altitude QT is 10 cm, then its base PR is ______.
Area of a right-angled triangle is 30 cm2. If its smallest side is 5 cm, then its hypotenuse is ______.
Using determinants, find the area of ΔPQR with vertices P(3, 1), Q(9, 3) and R(5, 7). Also, find the equation of line PQ using determinants.
